与维格纳定理有关的函数方程

IF 0.9 3区数学 Q2 MATHEMATICS

Aequationes Mathematicae Pub Date : 2024-03-07 DOI:10.1007/s00010-024-01042-8

Xujian Huang, Liming Zhang, Shuming Wang

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引用次数: 0

摘要

摘要 G. Maksa 和 Z. Páles 提出的一个未决问题是找到函数方程 $$\begin{aligned} 的一般解。\f(x)-beta f(y)\Vert ：={vert x-\beta y\Vert ：\in {\mathbb {T}_n\}\quad (x,y\in H) \end{aligned}$$ 其中 $f: H \rightarrow K$ 是两个复规范空间之间的关系，而 ${\mathbb {T}}_n:=\{e^{i\frac{2k\pi }{n}}: k=1, \cdots ,n\}$ 是第 n 个统一根的集合。借助著名的维格纳单元-反单元定理，我们证明如果 $n\ge 3$ 和 H 和 K 是复内积空间，那么当且仅当存在相位函数 $\sigma : H\rightarrow {\mathbb {T}}_n$ 使得 $\sigma \cdot f$ 是线性或反线性等值线时，f 满足上述方程。此外，如果解f是连续的，那么f就是线性或反线性等值线。

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A functional equation related to Wigner’s theorem

An open problem posed by G. Maksa and Z. Páles is to find the general solution of the functional equation

$$\begin{aligned} \{\Vert f(x)-\beta f(y)\Vert : \beta \in {\mathbb {T}}_n\}=\{\Vert x-\beta y\Vert : \beta \in {\mathbb {T}}_n\} \quad (x,y\in H) \end{aligned}$$

where $f: H \rightarrow K$ is between two complex normed spaces and ${\mathbb {T}}_n:=\{e^{i\frac{2k\pi }{n}}: k=1, \cdots ,n\}$ is the set of the nth roots of unity. With the aid of the celebrated Wigner’s unitary-antiunitary theorem, we show that if $n\ge 3$ and H and K are complex inner product spaces, then f satisfies the above equation if and only if there exists a phase function $\sigma : H\rightarrow {\mathbb {T}}_n$ such that $\sigma \cdot f$ is a linear or anti-linear isometry. Moreover, if the solution f is continuous, then f is a linear or anti-linear isometry.

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来源期刊

Aequationes Mathematicae MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

1.70

自引率

12.50%

发文量

审稿时长

>12 weeks

期刊介绍： aequationes mathematicae is an international journal of pure and applied mathematics, which emphasizes functional equations, dynamical systems, iteration theory, combinatorics, and geometry. The journal publishes research papers, reports of meetings, and bibliographies. High quality survey articles are an especially welcome feature. In addition, summaries of recent developments and research in the field are published rapidly.